A martingale approach to noncommutative stochastic calculus

Abstract

We present a new approach to noncommutative stochastic calculus that is, like the classical theory, based primarily on the martingale property. Using this approach, we introduce a general theory of stochastic integration and quadratic (co)variation for a certain class of noncommutative processes, analogous to semimartingales, that includes both the q-Brownian motions and classical matrix-valued Brownian motions. As applications, we obtain Burkholder--Davis--Gundy inequalities (with p ≥ 2) for continuous-time noncommutative martingales and a noncommutative It\o's formula for "adapted C2 maps," including trace -polynomial maps and operator functions associated to the noncommutative C2 scalar functions R C introduced by Nikitopoulos, as well as the more general multivariate tracial noncommutative C2 functions introduced by Jekel, Li, and Shlyakhtenko.